AbstractWe give sufficient conditions for the universality of tensor products {Tn⊗Rn:n∈N} of sequences of operators defined on Fréchet spaces. In particular we study when the tensor product T⊗R of two operators is chaotic in the sense of Devaney. Applications are given for natural operators on function spaces of several variables, in Infinite Holomorphy, and for multiplication operators on the algebra L(E) following the study of Kit Chan
ABSTRACT. It is shown that the above sequences always determine linear trans-formations and if the s...
In this note, the universality of a sequence of operators associated to the partial sums of the Tayl...
AbstractChan and Shapiro showed that each (non-trivial) translation operator f(z)↦Tλf(z+λ) acting on...
AbstractWe give sufficient conditions for the universality of tensor products {Tn⊗Rn:n∈N} of sequenc...
Abstract. The purpose of the present paper is to study tensor prod-ucts of operator systems. After g...
AbstractThe purpose of the present paper is to lay the foundations for a systematic study of tensor ...
AbstractIn this paper, we study chaos for bounded operators on Banach spaces. First, it is proved th...
For bounded linear operators defined on complex infinite-dimensional Banach space, H. Zariouh, in an...
In this paper we study the universality of (cnTn) where (cn) is a scalar sequence and (Tn) is a univ...
AbstractIn this paper we lay the foundations for a systematic study of tensor products of subspaces ...
Given a finite or countably infinite family of Hilbert spaces \((H_j)_{j\in N} \), we study the Hilb...
Abstract. The characteristic matrix of the tensor product of two Hilbert space operators is analyzed...
We present an inequality for tensor product of positive operators on Hilbert spaces by considering t...
We prove that, under certain conditions, uniform weak mixing (to zero) of the bounded sequences in B...
In this paper we show that quasisimilar n-tuples of tensor products of (p, k)-quasihyponormal operat...
ABSTRACT. It is shown that the above sequences always determine linear trans-formations and if the s...
In this note, the universality of a sequence of operators associated to the partial sums of the Tayl...
AbstractChan and Shapiro showed that each (non-trivial) translation operator f(z)↦Tλf(z+λ) acting on...
AbstractWe give sufficient conditions for the universality of tensor products {Tn⊗Rn:n∈N} of sequenc...
Abstract. The purpose of the present paper is to study tensor prod-ucts of operator systems. After g...
AbstractThe purpose of the present paper is to lay the foundations for a systematic study of tensor ...
AbstractIn this paper, we study chaos for bounded operators on Banach spaces. First, it is proved th...
For bounded linear operators defined on complex infinite-dimensional Banach space, H. Zariouh, in an...
In this paper we study the universality of (cnTn) where (cn) is a scalar sequence and (Tn) is a univ...
AbstractIn this paper we lay the foundations for a systematic study of tensor products of subspaces ...
Given a finite or countably infinite family of Hilbert spaces \((H_j)_{j\in N} \), we study the Hilb...
Abstract. The characteristic matrix of the tensor product of two Hilbert space operators is analyzed...
We present an inequality for tensor product of positive operators on Hilbert spaces by considering t...
We prove that, under certain conditions, uniform weak mixing (to zero) of the bounded sequences in B...
In this paper we show that quasisimilar n-tuples of tensor products of (p, k)-quasihyponormal operat...
ABSTRACT. It is shown that the above sequences always determine linear trans-formations and if the s...
In this note, the universality of a sequence of operators associated to the partial sums of the Tayl...
AbstractChan and Shapiro showed that each (non-trivial) translation operator f(z)↦Tλf(z+λ) acting on...